题目如下:
A chess knight can move as indicated in the chess diagram below:
.
This time, we place our chess knight on any numbered key of a phone pad (indicated above), and the knight makes
N-1hops. Each hop must be from one key to another numbered key.Each time it lands on a key (including the initial placement of the knight), it presses the number of that key, pressing
Ndigits total.How many distinct numbers can you dial in this manner?
Since the answer may be large, output the answer modulo
10^9 + 7.Example 1:
Input: 1 Output: 10Example 2:
Input: 2 Output: 20Example 3:
Input: 3 Output: 46Note:
1 <= N <= 5000
解题思路:很明显的动态规划的场景。首先我们可以维护如下的一个映射字典:key为到达的数字,value为可以由哪些数字经过一次跳跃到达key的数字。接下来假设dp[i][j] 为经过跳跃i次并且最后一次跳跃的终点是j,那么有dp[i][j] = dp[i-1][dic[j][0]] + dp[i-1][dic[j][1]] + ... dp[i-1][dic[j][n]]。最终的结果就是dp[N][0] + dp[N][1] + ... dp[N][9]。后来经过测试发现,这种解法会超时,因为题目约定了N最大是5000,因此可以事先计算出1~5000的所有结果缓存起来。
dic[1] = [6,8] dic[2] = [7,9] dic[3] = [4,8] dic[4] = [3,9,0] dic[5] = [] dic[6] = [1,7,0] dic[7] = [2,6] dic[8] = [1,3] dic[9] = [2,4] dic[0] = [4,6]
代码如下:
class Solution(object): res = [] def knightDialer(self, N): """ :type N: int :rtype: int """ if len(self.res) != 0: return self.res[N-1] dic = {} dic[1] = [6,8] dic[2] = [7,9] dic[3] = [4,8] dic[4] = [3,9,0] dic[5] = [] dic[6] = [1,7,0] dic[7] = [2,6] dic[8] = [1,3] dic[9] = [2,4] dic[0] = [4,6] dp = [] for i in range(5001): if i == 0: tl = [1] * 10 else: tl = [0] * 10 dp.append(tl) for i in range(5001): for j in range(10): for k in dic[j]: dp[i][j] += dp[i-1][k] for i in range(5001): self.res.append(sum(dp[i]) % (pow(10,9) + 7)) return self.res[N-1]